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Review of Trigonometry for Math 207 – Calculus I Analytic Trigonometry. 7. Basic Trigonometric Identities. Example 1 – Simplifying a Trigonometric Expression. Simplify the expression cos t + tan t sin t . Solution: We start by rewriting the expression in terms of sine and cosine.
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Review of Trigonometry for Math 207 – Calculus I • Analytic Trigonometry • 7
Example 1 – Simplifying a Trigonometric Expression • Simplify the expression cos t + tan t sin t. • Solution:We start by rewriting the expression in terms of sine andcosine. • cos t + tan t sin t = cos t + sin t • = • = • = sec t • Reciprocal identity • Common denominator • Pythagorean identity • Reciprocal identity
Addition and Subtraction Formulas • We now derive identities for trigonometric functions of sums and differences.
Double-Angle Formulas • The formulas in the following box are immediate consequences of the addition formulas.
Half-Angle Formulas • The following formulas allow us to write any trigonometric expression involving even powers of sine and cosine in terms of the first power of cosine only. • This technique is important in calculus. The Half-Angle Formulas are immediate consequences of these formulas.
Example 2 – Lowering Powers in a Trigonometric Expression using Double Angle and Half Angle formulas • Express sin2x cos2x in terms of the first power of cosine. • Solution: We use the formulas for lowering powers repeatedly.
Example 2 – Solution • cont’d • Another way to obtain this identity is to use the Double-Angle Formula for Sine in the form sin x cos x = sin 2x. Thus
Example 3 – Evaluating an Expression Involving Inverse Trigonometric Functions • Evaluate sin 2, where cos =with in Quadrant II. • Solution : We first sketch the angle in standard position with terminal side in Quadrant II: • Since cos = x/r = , we can label a side and the hypotenuse of the triangle • To find the remaining side, we use the Pythagorean Theorem.
Example 3 – Solution • cont’d • x2 + y2 = r2 • (–2)2 + y2 = 52 • y = • y = + • We can now use the Double-Angle Formula for Sine. • Pythagorean Theorem • x = –2, r = 5 • Solve for y2 • Because y > 0 • Double-Angle Formula • From the triangle • Simplify
Example 4: Basic Trigonometric Equations • Find all solutions of the equations: • (a) 2 sin – 1 = 0 (b) tan2 – 3 = 0 • Solution:(a) We start by isolating sin . • 2 sin – 1 = 0 • 2 sin = 1 • sin = • Given equation • Add 1 • Divide by 2
Example 4 - Solution • cont’d • The solutions are • = + 2k = + 2k • where k is any integer. • (b) We start by isolating tan . • tan2 – 3 = 0 • tan2 = 3 • tan = • Given equation • Add 3 • Take the square root
Example 4 - Solution • cont’d • Because tangent has period , we first find the solutions in any interval of length . In the interval (–/2, /2) the solutions are = /3 and = –/3. • To get all solutions, we add integer multiples of to these solutions: • = + k = – + k • where k is any integer.
Example 5 – A Trigonometric Equation of Quadratic Type • Solve the equation 2 cos2 – 7 cos + 3 = 0. • Solution: • We factor the left-hand side of the equation. • 2 cos2 – 7 cos + 3 = 0 • (2 cos – 1)(cos – 3) = 0 • 2 cos – 1 = 0 or cos – 3 = 0 • cos = or cos = 3 • Given equation • Factor • Set each factor equal to 0 • Solve for cos
Example 5 – Solution • cont’d • Because cosine has period 2, we first find the solutions in the interval [0, 2). For the first equation the solutions are = /3 and = 5/3
Example 5 – Solution • cont’d • The second equation has no solution because cos is never greater than 1. • Thus the solutions are • = + 2k = + 2k • where k is any integer.
Example 6 – Solving a Trigonometric Equation by Factoring • Solve the equation 5 sin cos + 4 cos = 0. • Solution:We factor the left-hand side of the equation. • 5 sin cos + 2 cos = 0 • cos (5 sin + 2) = 0 • cos = 0 or 5 sin + 4 = 0 • sin = –0.8 • Given equation • Factor • Set each factor equal to 0 • Solve for sin
Example 6 – Solution • cont’d • Because sine and cosine have period 2, we first find the solutions of these equations in an interval of length 2. • For the first equation the solutions in the interval [0, 2) are = /2 and = 3/2 . To solve the second equation, we take sin–1 of each side. • sin = –0.80 • = sin–1(–0.80) • Second equation • Take sin–1 of each side
Example 6 – Solution • cont’d • –0.93 • So the solutions in an interval of length 2 are = –0.93and = + 0.93 4.07 • Calculator (in radian mode)
Example 6 – Solution • cont’d • We get all the solutions of the equation by adding integer multiples of 2 to these solutions. • = + 2k = + 2k • –0.93 + 2k 4.07 + 2k • where k is any integer.
Example 7 – Solving by Using a Trigonometric Identity • Solve the equation 1 + sin = 2 cos2. • Solution:We first need to rewrite this equation so that it contains only one trigonometric function. To do this, we use a trigonometric identity: • 1 + sin = 2 cos2 • 1 + sin = 2(1 – sin2) • 2 sin2 + sin – 1 = 0 • (2 sin – 1)(sin + 1) = 0 • Given equation • Pythagorean identity • Put all terms on one side • Factor
Example 7 – Solution • cont’d • 2 sin – 1 = 0 or sin + 1 = 0 • sin = or sin = –1 • = or = • Because sine has period 2, we get all the solutions of the equation by adding integer multiples of 2 to these solutions. • Set each factor equal to 0 • Solve for sin • Solve for in the interval [0, 2)
Example 7 – Solution • cont’d • Thus the solutions are = + 2k = + 2k = + 2k where k is any integer.
Example 8 – Solving Graphically by Finding Intersection Points • Find the values of x for which the graphs of f(x) = sin x and g(x) = cos x intersect. Solution :The graphs intersect where f(x) = g(x). We graph y1 = sin x and y2 = cos x on the same screen, for x between 0 and 2. • (a) • (b)
Example 8 – Solution • cont’d • Using or the intersect command on the graphing calculator, we see that the two points of intersection in this interval occur where x 0.785 and x 3.927. • Since sine and cosine are periodic with period 2, the intersection points occur where • x 0.785 + 2k and x 3.927 + 2k • where k is any integer.
Equations with Trigonometric Functions of Multiples of Angles
Example 9 – A Trigonometric Equation Involving a Multiple of an Angle • Consider the equation 2 sin 3 – 1 = 0. • (a) Find all solutions of the equation. • (b) Find the solutions in the interval [0, 2). • Solution: • (a) We first isolate sin 3 and then solve for the angle 3. • 2 sin 3 – 1 = 0 • 2 sin 3 = 1 • sin 3 = • Given equation • Add 1 • Divide by 2
Example 9 – Solution • cont’d • 3 = • Solve for 3 in the interval [0, 2)
Example 9 – Solution • cont’d • To get all solutions, we add integer multiples of 2 to these solutions. So the solutions are of the form • 3 = + 2k 3 = + 2k • To solve for , we divide by 3 to get the solutions • where k is any integer.
Example 9 – Solution • cont’d • (b) The solutions from part (a) that are in the interval [0, 2) correspond to k = 0, 1, and 2. For all other values of k the corresponding values of lie outside this interval. • So the solutions in the interval [0, 2) are